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      Symmetric Nonnegative Matrix Factorization: Algorithms and Applications to Probabilistic Clustering

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          From few to many: illumination cone models for face recognition under variable lighting and pose

          A.S. Georghiades, P.N. Belhumeur, D.J. Kriegman (2001)
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            Exploring the Metabolic and Genetic Control of Gene Expression on a Genomic Scale

            J. L. DeRisi (1997)
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              Projected gradient methods for nonnegative matrix factorization.

              Chih-Jen Lin (2007)
              Nonnegative matrix factorization (NMF) can be formulated as a minimization problem with bound constraints. Although bound-constrained optimization has been studied extensively in both theory and practice, so far no study has formally applied its techniques to NMF. In this letter, we propose two projected gradient methods for NMF, both of which exhibit strong optimization properties. We discuss efficient implementations and demonstrate that one of the proposed methods converges faster than the popular multiplicative update approach. A simple Matlab code is also provided.
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                Author and article information

                Journal
                Title: IEEE Transactions on Neural Networks
                Abbreviated Title: IEEE Trans. Neural Netw.
                Publisher: Institute of Electrical and Electronics Engineers (IEEE)
                ISSN (Print): 1045-9227
                ISSN (Electronic): 1941-0093
                Publication date Created: December 2011
                Publication date (Print): December 2011
                Volume: 22
                Issue: 12
                Pages: 2117-2131
                Article
                DOI: 10.1109/TNN.2011.2172457
                SO-VID: eb8486ad-2704-4049-8ab2-93088d9ecf3d
                Copyright © © 2011
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